When Ext is a Batalin–Vilkovisky algebra

Kowalzig, Niels

doi:10.4171/jncg/298

“…In the case of Frobenius or (twisted) Calabi-Yau algebras (cf. Example 6.17), one can even define a homotopy calculus structure of Hochschild cochains over themselves: the main difficulty here consists in finding a cyclic operator on C ‚ pA, Aq which does not always exist but does so if A is what is called an anti Yetter-Drinfel'd contramodule over A e " A b A op , see [Ko2] for a treatment. The corresponding calculus structure can then be obtained by the specific form of the cyclic operator (see op.…”

Section: )mentioning

confidence: 99%

“…

An analogous statement for (left) Hopf algebroids pU, Aq, that is, when Ext U pA, Aq happens to be a Batalin-Vilkoviskiȋ algebra appears to be more involved [Ko2]; this includes the case for Hochschild cohomology as pA e , Aq can be seen as a Hopf algebroid (but not as a Hopf algebra). It is known that the Gerstenhaber structure on Hochschild cohomology does not always extend (or rather restrict) to a Batalin-Vilkoviskiȋ algebra structure but only in certain cases as, for example, symmetric algebras, certain Frobenius algebras, as well as (twisted) Calabi-Yau algebras [Tr,LaZhZi,Gi,KoKr2]; a sufficiency criterion when this is the case can be found in [Ko2].On the other hand, if U is a braided (in the sense of quasi-triangular) bialgebra over K, then the Gerstenhaber bracket on Ext ‚ U pK, Kq turns out to be zero [Tai, Rem. 5.4].

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mentioning

confidence: 98%

Higher Brackets on Cyclic and Negative Cyclic (Co)Homology

Fiorenza

¹

,

Kowalzig

²

2018

International Mathematics Research Notices

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An analogous statement for (left) Hopf algebroids pU, Aq, that is, when Ext U pA, Aq happens to be a Batalin-Vilkoviskiȋ algebra appears to be more involved [Ko2]; this includes the case for Hochschild cohomology as pA e , Aq can be seen as a Hopf algebroid (but not as a Hopf algebra). It is known that the Gerstenhaber structure on Hochschild cohomology does not always extend (or rather restrict) to a Batalin-Vilkoviskiȋ algebra structure but only in certain cases as, for example, symmetric algebras, certain Frobenius algebras, as well as (twisted) Calabi-Yau algebras [Tr,LaZhZi,Gi,KoKr2]; a sufficiency criterion when this is the case can be found in [Ko2].On the other hand, if U is a braided (in the sense of quasi-triangular) bialgebra over K, then the Gerstenhaber bracket on Ext ‚ U pK, Kq turns out to be zero [Tai, Rem. 5.4]. At least for a cocommutative Hopf algebra, this can be directly seen from Eq. (1.1) together with the fact that in this case one obtains B " 0, as mentioned in [Me2, p. 321] again. In general, the possible cohomological vanishing of the Gerstenhaber bracket can be considered a consequence from the fact that the binary operation up to homotopy on the cochain complex inducing it, is homotopic to zero. This homotopy induces in turn a degree´2 Lie bracket on cohomology, which together with the cup product makes it an e 3 -algebra. The existence of an e 3 -algebra structure on the cohomology of a braided Hopf algebra (or rather bialgebra) has been conjectured in [Me2, Conj. 25], inspired by a conjecture attributed to Kontsevich in [Sh2] that this is the case for the Gerstenhaber-Schack cohomology of a Hopf algebra. This in turn amounts to an Ext-group in the category of tetramodules (or Hopf bimodules) [Tai, Cor. 3.9], or, in the finite dimensional case, equivalently to an Ext-group over the Drinfel'd double as a braided bialgebra. In [Sh2, Sh1], Shoikhet developed an approach based on n-fold monoidal abelian categories that implies that the Gerstenhaber-Schack cohomology groups indeed do carry the structure of an e 3 -algebra. More recently, Ginot and Yalin [GiYa] showed how to obtain this from the E 3 -algebra structure on the higher Hochschild complex of a E 2 -algebras given by the solution to the higher Deligne conjecture. This indeed implies the existence of an E 3 -structure on the deformation complex of a dg bialgebra, but an explicit expression for the degree´2 Lie bracket remains elusive.There is, however, quite an explicit degree´2 Lie bracket on the negative cyclic cohomology HC ‚ pAq of, for example, a symmetric algebra A, obtained by Menichi [Me1] generalising the construction of Chas-Sullivan's string topology bracket [ChSu].Since negative cyclic cohomology is related to Hochschild cohomology by a long exact sequence (that is, a version of the so-called SBI sequence), it is therefore tempting to presume that a possible braiding implies suitable vanishings such that the Chas-Sullivan-Menichi bracket can be transferred to the Hochschild cohomology, inducing the Lie bracket of the ...

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“…Again, roughly, the generalization from Hopf algebras consists of replacing the ground field k, over which everything is tensored, by a noncommutative ring R. Thus the objects underlying representations of a Hopf algebroid consist not of vector spaces over k, but of bimodules over R. It seems that Hopf algebroids provide an example of a construct that is the most noncommutative in noncommutative geometry. We point out that a definition of cyclic cohomology with an analogue of stable anti-Yetter-Drinfeld contramodule coefficients has been given by Kowalzig in [15]. Our goal here is to explain the formulas that appear there as an inevitable consequence of the general machinery.…”

Section: Introductionmentioning

confidence: 97%

“…As was observed in [2] or [15], we can equip a right contramodule M with a structure of a left R l -module via:…”

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A Categorical Approach to Cyclic Cohomology of Quasi-Hopf Algebras and Hopf Algebroids

Kobyzev

¹

,

Shapiro

²

2018

Appl Categor Struct

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We apply categorical machinery to the problem of defining cyclic cohomology with coefficients in two particular cases, namely quasi-Hopf algebras and Hopf algebroids. In the case of the former, no definition was thus far available in the literature, and while a definition exists for the latter, we feel that our approach demystifies the seemingly arbitrary formulas present there. This paper emphasizes the importance of working with a biclosed monoidal category in order to obtain natural coefficients for a cyclic theory that are analogous to the stable anti-Yetter-Drinfeld contramodules for Hopf algebras.

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